The minimum covariance determinant estimator for interval-valued data

IF 1.6 2区数学 Q2 COMPUTER SCIENCE, THEORY & METHODS Statistics and Computing Pub Date : 2024-02-17 DOI:10.1007/s11222-024-10386-9

Wan Tian, Zhongfeng Qin

引用次数: 0

Abstract

Effective estimation of covariance matrices is crucial for statistical analyses and applications. In this paper, we focus on the robust estimation of covariance matrix for interval-valued data in low and moderately high dimensions. In the low-dimensional scenario, we extend the Minimum Covariance Determinant (MCD) estimator to interval-valued data. We derive an iterative algorithm for computing this estimator, demonstrate its convergence, and theoretically establish that it retains the high breakdown-point property of the MCD estimator. Further, we propose a projection-based estimator and a regularization-based estimator to extend the MCD estimator to moderately high-dimensional settings, respectively. We propose efficient iterative algorithms for solving these two estimators and demonstrate their convergence properties. We conduct extensive simulation studies and real data analysis to validate the finite sample properties of these proposed estimators.

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区间值数据的最小协方差行列式估计器

有效估计协方差矩阵对统计分析和应用至关重要。在本文中，我们将重点关注低维和中高维区间值数据协方差矩阵的稳健估计。在低维情况下，我们将最小协方差判定（MCD）估计器扩展到区间值数据。我们推导了计算该估计器的迭代算法，证明了它的收敛性，并从理论上确定它保留了 MCD 估计器的高分解点特性。此外，我们还提出了一种基于投影的估计器和一种基于正则化的估计器，分别将 MCD 估计器扩展到中高维环境。我们提出了求解这两种估计器的高效迭代算法，并证明了它们的收敛特性。我们进行了大量的模拟研究和实际数据分析，以验证这些估计器的有限样本特性。

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来源期刊

Statistics and Computing 数学-计算机：理论方法

CiteScore

3.20

自引率

4.50%

发文量

审稿时长

6-12 weeks

期刊介绍： Statistics and Computing is a bi-monthly refereed journal which publishes papers covering the range of the interface between the statistical and computing sciences. In particular, it addresses the use of statistical concepts in computing science, for example in machine learning, computer vision and data analytics, as well as the use of computers in data modelling, prediction and analysis. Specific topics which are covered include: techniques for evaluating analytically intractable problems such as bootstrap resampling, Markov chain Monte Carlo, sequential Monte Carlo, approximate Bayesian computation, search and optimization methods, stochastic simulation and Monte Carlo, graphics, computer environments, statistical approaches to software errors, information retrieval, machine learning, statistics of databases and database technology, huge data sets and big data analytics, computer algebra, graphical models, image processing, tomography, inverse problems and uncertainty quantification. In addition, the journal contains original research reports, authoritative review papers, discussed papers, and occasional special issues on particular topics or carrying proceedings of relevant conferences. Statistics and Computing also publishes book review and software review sections.

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